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The graph of a rational function f is shown below.
Assume that all asymptotes and intercepts are shown and that the graph has no "holes".

Use the graph to complete the following.

The Graph Of A Rational Function F Is Shown Below Assume That All Asymptotes And Intercepts Are Shown And That The Graph Has No Holes Use The Graph To Complete class=
The Graph Of A Rational Function F Is Shown Below Assume That All Asymptotes And Intercepts Are Shown And That The Graph Has No Holes Use The Graph To Complete class=

Sagot :

We have y+2 = 0 and x - 2 = 0. The provided function has an x and y-intercept of -2 and +2, respectively. There is no vertical asymptote. Two is the horizontal asymptote.

What is a graph?

A diagram depicting the relationship between two or more variables, each measured along with one of a pair of axes at right angles.

The y-intercept of a function is determined by the intersection of its graph with the y-axis. The value of y on the y-axis at which the considered function crosses it is called the y-intercept.

Assume the following equation: y = f (x)

We have x   =0- 2 and y+2 = 0,The x and y intercept of the given function is -2 and +2.

The vertical asymptote is none. The horizontal asymptote is 2.

Hence,we have y+2 = 0 and x - 2 = 0. The provided function has an x and y-intercept of -2 and +2, respectively. There is no vertical asymptote. Two is the horizontal asymptote.

To learn more about the graph, refer to the link;

https://brainly.com/question/14375099

#SPJ1

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